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Quaternion¶

A unit quaternion used for representing 3D rotations.

Description¶

The Quaternion built-in Variant type is a 4D data structure that represents rotation in the form of a Hamilton convention quaternion. Compared to the Basis type which can store both rotation and scale, quaternions can only store rotation.

A Quaternion is composed by 4 floating-point components: w, x, y, and z. These components are very compact in memory, and because of this some operations are more efficient and less likely to cause floating-point errors. Methods such as get_angle, get_axis, and slerp are faster than their Basis counterparts.

For a great introduction to quaternions, see this video by 3Blue1Brown. You do not need to know the math behind quaternions, as Redot provides several helper methods that handle it for you. These include slerp and spherical_cubic_interpolate, as well as the * operator.

Note: Quaternions must be normalized before being used for rotation (see normalized).

Note: Similarly to Vector2 and Vector3, the components of a quaternion use 32-bit precision by default, unlike float which is always 64-bit. If double precision is needed, compile the engine with the option precision=double.

Note

There are notable differences when using this API with C#. See C# API differences to GDScript for more information.

Tutorials¶

Properties¶

float	w	`1.0`
float	x	`0.0`
float	y	`0.0`
float	z	`0.0`

Constructors¶

Quaternion	Quaternion()
Quaternion	Quaternion(from: Quaternion)
Quaternion	Quaternion(arc_from: Vector3, arc_to: Vector3)
Quaternion	Quaternion(axis: Vector3, angle: float)
Quaternion	Quaternion(from: Basis)
Quaternion	Quaternion(x: float, y: float, z: float, w: float)

Methods¶

float	angle_to(to: Quaternion) const
float	dot(with: Quaternion) const
Quaternion	exp() const
Quaternion	from_euler(euler: Vector3) static
float	get_angle() const
Vector3	get_axis() const
Vector3	get_euler(order: int = 2) const
Quaternion	inverse() const
bool	is_equal_approx(to: Quaternion) const
bool	is_finite() const
bool	is_normalized() const
float	length() const
float	length_squared() const
Quaternion	log() const
Quaternion	normalized() const
Quaternion	slerp(to: Quaternion, weight: float) const
Quaternion	slerpni(to: Quaternion, weight: float) const
Quaternion	spherical_cubic_interpolate(b: Quaternion, pre_a: Quaternion, post_b: Quaternion, weight: float) const
Quaternion	spherical_cubic_interpolate_in_time(b: Quaternion, pre_a: Quaternion, post_b: Quaternion, weight: float, b_t: float, pre_a_t: float, post_b_t: float) const

Operators¶

bool	operator !=(right: Quaternion)
Quaternion	operator *(right: Quaternion)
Vector3	operator *(right: Vector3)
Quaternion	operator *(right: float)
Quaternion	operator *(right: int)
Quaternion	operator +(right: Quaternion)
Quaternion	operator -(right: Quaternion)
Quaternion	operator /(right: float)
Quaternion	operator /(right: int)
bool	operator ==(right: Quaternion)
float	operator [](index: int)
Quaternion	operator unary+()
Quaternion	operator unary-()

Constants¶

IDENTITY = Quaternion(0, 0, 0, 1) 🔗

The identity quaternion, representing no rotation. This has the same rotation as Basis.IDENTITY.

If a Vector3 is rotated (multiplied) by this quaternion, it does not change.

Property Descriptions¶

float w = 1.0 🔗

W component of the quaternion. This is the "real" part.

Note: Quaternion components should usually not be manipulated directly.

float x = 0.0 🔗

X component of the quaternion. This is the value along the "imaginary" i axis.

Note: Quaternion components should usually not be manipulated directly.

float y = 0.0 🔗

Y component of the quaternion. This is the value along the "imaginary" j axis.

Note: Quaternion components should usually not be manipulated directly.

float z = 0.0 🔗

Z component of the quaternion. This is the value along the "imaginary" k axis.

Note: Quaternion components should usually not be manipulated directly.

Constructor Descriptions¶

Quaternion Quaternion() 🔗

Constructs a Quaternion identical to the IDENTITY.

Quaternion Quaternion(from: Quaternion)

Constructs a Quaternion as a copy of the given Quaternion.

Quaternion Quaternion(arc_from: Vector3, arc_to: Vector3)

Constructs a Quaternion representing the shortest arc between arc_from and arc_to. These can be imagined as two points intersecting a sphere's surface, with a radius of 1.0.

Quaternion Quaternion(axis: Vector3, angle: float)

Constructs a Quaternion representing rotation around the axis by the given angle, in radians. The axis must be a normalized vector.

Quaternion Quaternion(from: Basis)

Constructs a Quaternion from the given rotation Basis.

This constructor is faster than Basis.get_rotation_quaternion, but the given basis must be orthonormalized (see Basis.orthonormalized). Otherwise, the constructor fails and returns IDENTITY.

Quaternion Quaternion(x: float, y: float, z: float, w: float)

Constructs a Quaternion defined by the given values.

Note: Only normalized quaternions represent rotation; if these values are not normalized, the new Quaternion will not be a valid rotation.

Method Descriptions¶

float angle_to(to: Quaternion) const 🔗

Returns the angle between this quaternion and to. This is the magnitude of the angle you would need to rotate by to get from one to the other.

Note: The magnitude of the floating-point error for this method is abnormally high, so methods such as is_zero_approx will not work reliably.

float dot(with: Quaternion) const 🔗

Returns the dot product between this quaternion and with.

This is equivalent to (quat.x * with.x) + (quat.y * with.y) + (quat.z * with.z) + (quat.w * with.w).

Quaternion exp() const 🔗

Returns the exponential of this quaternion. The rotation axis of the result is the normalized rotation axis of this quaternion, the angle of the result is the length of the vector part of this quaternion.

Quaternion from_euler(euler: Vector3) static 🔗

Constructs a new Quaternion from the given Vector3 of Euler angles, in radians. This method always uses the YXZ convention (@GlobalScope.EULER_ORDER_YXZ).

float get_angle() const 🔗

Returns the angle of the rotation represented by this quaternion.

Note: The quaternion must be normalized.

Vector3 get_axis() const 🔗

Returns the rotation axis of the rotation represented by this quaternion.

Vector3 get_euler(order: int = 2) const 🔗

Returns this quaternion's rotation as a Vector3 of Euler angles, in radians.

The order of each consecutive rotation can be changed with order (see EulerOrder constants). By default, the YXZ convention is used (@GlobalScope.EULER_ORDER_YXZ): Z (roll) is calculated first, then X (pitch), and lastly Y (yaw). When using the opposite method from_euler, this order is reversed.

Quaternion inverse() const 🔗

Returns the inverse version of this quaternion, inverting the sign of every component except w.

bool is_equal_approx(to: Quaternion) const 🔗

Returns true if this quaternion and to are approximately equal, by running @GlobalScope.is_equal_approx on each component.

bool is_finite() const 🔗

Returns true if this quaternion is finite, by calling @GlobalScope.is_finite on each component.

bool is_normalized() const 🔗

Returns true if this quaternion is normalized. See also normalized.

float length() const 🔗

Returns this quaternion's length, also called magnitude.

float length_squared() const 🔗

Returns this quaternion's length, squared.

Note: This method is faster than length, so prefer it if you only need to compare quaternion lengths.

Quaternion log() const 🔗

Returns the logarithm of this quaternion. Multiplies this quaternion's rotation axis by its rotation angle, and stores the result in the returned quaternion's vector part (x, y, and z). The returned quaternion's real part (w) is always 0.0.

Quaternion normalized() const 🔗

Returns a copy of this quaternion, normalized so that its length is 1.0. See also is_normalized.

Quaternion slerp(to: Quaternion, weight: float) const 🔗

Performs a spherical-linear interpolation with the to quaternion, given a weight and returns the result. Both this quaternion and to must be normalized.

Quaternion slerpni(to: Quaternion, weight: float) const 🔗

Performs a spherical-linear interpolation with the to quaternion, given a weight and returns the result. Unlike slerp, this method does not check if the rotation path is smaller than 90 degrees. Both this quaternion and to must be normalized.

Quaternion spherical_cubic_interpolate(b: Quaternion, pre_a: Quaternion, post_b: Quaternion, weight: float) const 🔗

Performs a spherical cubic interpolation between quaternions pre_a, this vector, b, and post_b, by the given amount weight.

Quaternion spherical_cubic_interpolate_in_time(b: Quaternion, pre_a: Quaternion, post_b: Quaternion, weight: float, b_t: float, pre_a_t: float, post_b_t: float) const 🔗

Performs a spherical cubic interpolation between quaternions pre_a, this vector, b, and post_b, by the given amount weight.

It can perform smoother interpolation than spherical_cubic_interpolate by the time values.

Operator Descriptions¶

bool operator !=(right: Quaternion) 🔗

Returns true if the components of both quaternions are not exactly equal.

Note: Due to floating-point precision errors, consider using is_equal_approx instead, which is more reliable.

Quaternion operator *(right: Quaternion) 🔗

Composes (multiplies) two quaternions. This rotates the right quaternion (the child) by this quaternion (the parent).

Vector3 operator *(right: Vector3) 🔗

Rotates (multiplies) the right vector by this quaternion, returning a Vector3.

Quaternion operator *(right: float) 🔗

Multiplies each component of the Quaternion by the right float value.